Mixing time and isoperimetry in random geometric graphs
Abstract
In this paper we study the mixing time of the simple random walk on the giant component of supercritical d-dimensional random geometric graphs generated by the unit intensity Poisson Point Process in a d-dimensional cube of volume n. With rg denoting the threshold for having a giant component, we show that for every ε > 0 and any r (1+ε)rg, the mixing time of the giant component is with high probability (n2/d/r2), thereby closing a gap in the literature. The main tool is an isoperimetric inequality which holds, w.h.p., for any large enough vertex set, a result which we believe is of independent interest. Our analysis also implies that the relaxation time is of the same order.
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